Created By : Abhinandan Kumar

Reviewed By : Rajashekhar Valipishetty

Last Updated : May 30, 2023


Enter the Angle (β)

Enter the Base (a)

Enter the Angle (γ)


Area of Triangle angle (β) 0.8 radians, side 31 meters and with angle (γ) 2 radians is 935.6312088 meters².

The area of a triangle is defined as the total space that is enclosed by any particular triangle. The basic formula to find the area of a given triangle is A = a² * sin(β) * sin(γ)/(2 * sin(β + γ)), where a is side, sin(β), sin(γ) are the angles of the given triangle. Area of Triangle angle (β) 0.8 radians, side 31 meters and with angle (γ) 2 radians is 935.6312088 meters².


    Area of a Triangle Angle(β) = 0.8 radians by side(a) = 31 m with angle(γ) = 2 radians in other units

Value unit
0.9356312 km2
0.5813757 mi2
935.6312088 m2
3069.6561969 ft2
36835.8743622 in2
1023.2187323 yd2
93563.12088 cm2
935631.2088 mm2

Steps:

Given that Angle (β) = 0.8 radians , Side (a) = 31 m and with Angle(γ) = 2 radians

We Know that, Area = a² * sin(β) * sin(γ)/(2 * sin(β + γ))

Substitute the values of the angle (β) = 0.8 radians , the side (a) = 31 m , and the with angle (γ) = 2 radians into the formula

31² * sin(m) * sin(0.8)/(2 * sin(radians + 2))

Simplify the above equations

∴ Area of a Triangle angle (β) 0.8 radians , side (b) 31 m and with angle (γ) = 2 radians is 935.6312088 m²